What is the value of m and n respectively if m39048458n is divisible by 8 and 11, where m and n are single digit positive integers?
Answers
Answer:
N = 4 & M = 6
Step-by-step explanation:
M39048458N
FOR DIVISIBILITY OF 11 ; ALTERNATE DIGIT SHOULD HAVE DIFFERENCE OF 0 OR 11 THEN IT WILL BE DIVISIBLE BY 11.
M + 9 + 4 + 4 + 8 - N - 5 - 8 - 0 - 3 = 0 OR 11
CASE-1
M - N = - 9
CASE-2
M - N = 2
FOR DIVISIBILITY OF 8 ; LAST 3 DIGITS SHOULD BE DIVISIBLE BY 8.
58N/8 =584 IS ONLY DIVISIBLE IN THE LINE OF 580 - 590
HENCE,
N = 4 &
SATISFYING IN CASES 1st IS NOT APPLICABLE HENCE N = 4 & M = 6
HOPE IT HELPS!!!
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Answer:here the question is what is the value of m and n
So first of all lets check if it is divisible by 8
Acc to rule last three digits will be divisible by 8 so last three digits must be 584 which is divisible by 8
So with answer 4 6 is there so
M=6 n = 4
Now check divisiblity of 11
Sum of odd positions - sum of even positions must be 0 or 11
By putting m = 6 n=4
(6+9+4+4+8)-(3+0+8+5+4)=11
Step-by-step explanation: